Minimum Cost Homomorphisms to Semicomplete Multipartite Digraphs

Abstract

For digraphs D and H, a mapping f: V(D) V(H) is a homomorphism of D to H if uv∈ A(D) implies f(u)f(v)∈ A(H). For a fixed directed or undirected graph H and an input graph D, the problem of verifying whether there exists a homomorphism of D to H has been studied in a large number of papers. We study an optimization version of this decision problem. Our optimization problem is motivated by a real-world problem in defence logistics and was introduced very recently by the authors and M. Tso. Suppose we are given a pair of digraphs D,H and a positive integral cost ci(u) for each u∈ V(D) and i∈ V(H). The cost of a homomorphism f of D to H is Σu∈ V(D)cf(u)(u). Let H be a fixed digraph. The minimum cost homomorphism problem for H, MinHOMP(H), is stated as follows: For input digraph D and costs ci(u) for each u∈ V(D) and i∈ V(H), verify whether there is a homomorphism of D to H and, if it does exist, find such a homomorphism of minimum cost. In our previous paper we obtained a dichotomy classification of the time complexity of for H being a semicomplete digraph. In this paper we extend the classification to semicomplete k-partite digraphs, k 3, and obtain such a classification for bipartite tournaments.

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